(n) distinct objects को (3) non-empty unlabelled groups में बांटने की संख्या किससे जुड़ती है?
The number of ways to divide (n) distinct objects into (3) non-empty unlabelled groups is connected with which form?
Explanation opens after your attempt
Correct Answer
A. (\frac{1}{3!}\left\(3^n-3\cdot2^n+3\right\))
Concept
First count (3) labelled non-empty groups, then remove the (3!) label permutations. In exams divide the labelled count for unlabelled groups.
Why this answer is correct
The correct answer is A. (\frac{1}{3!}\left\(3^n-3\cdot2^n+3\right\)). First count (3) labelled non-empty groups, then remove the (3!) label permutations. In exams divide the labelled count for unlabelled groups.
Exam Tip
पहले (3) labelled non-empty groups गिनते हैं, फिर labels की (3!) अदला-बदली हटाते हैं। परीक्षा में unlabelled groups के लिए labelled count divide करें।
Login to save your score, XP, coins and progress.